In this article, we use fixed-point methods and measure of noncompactness theory to focus on the problem of establishing the existence of at least a solution for the following functional integral equation $$u(t) = g (t, u(t)) + \int_0^t G(t, s, u(s))ds,\quad t \in [0,+\infty[,$$ in the space of all bounded and continuous real functions on $\mathbb{R}_+$, under suitable assumptions on $g$ and $G$. Also, we establish an extension of Darbo's fixed-point theorem and discuss some consequences.
Vetro, C., Vetro, F. (2017). On the existence of at least one solution for functional integral equations via the measure of noncompactness. BANACH JOURNAL OF MATHEMATICAL ANALYSIS, 11(3), 497-512 [10.1215/17358787-2017-0003].
On the existence of at least one solution for functional integral equations via the measure of noncompactness
VETRO, Calogero;VETRO, Francesca
2017-01-01
Abstract
In this article, we use fixed-point methods and measure of noncompactness theory to focus on the problem of establishing the existence of at least a solution for the following functional integral equation $$u(t) = g (t, u(t)) + \int_0^t G(t, s, u(s))ds,\quad t \in [0,+\infty[,$$ in the space of all bounded and continuous real functions on $\mathbb{R}_+$, under suitable assumptions on $g$ and $G$. Also, we establish an extension of Darbo's fixed-point theorem and discuss some consequences.
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